A paradifferential reduction for the gravity-capillary waves system at low regularity and applications

Abstract

We consider in this article the system of gravity-capillary waves in all dimensions and under the Zakharov/Craig-Sulem formulation. Using a paradifferential approach introduced by Alazard-Burq-Zuily, we symmetrize this system into a quasilinear dispersive equation whose principal part is of order 3/2. The main novelty, compared to earlier studies, is that this reduction is performed at the Sobolev regularity of quasilinear pdes: Hs(Rd) with s3/2+d/2, d being the dimension of the free surface. From this reduction, we deduce a blow-up criterion involving solely the Lipschitz norm of the velocity trace and the C5/2+-norm of the free surface. Moreover, we obtain an a priori estimate in the Hs-norm and the contraction of the solution map in the Hs-3/2-norm using the control of a Strichartz norm. These results have been applied in establishing a local well-posedness theory for non-Lipschitz initial velocity in our companion paper.